/* Copyright (C) 1996, 1997 John W. Eaton This file is part of Octave. Octave is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 2, or (at your option) any later version. Octave is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details. You should have received a copy of the GNU General Public License along with Octave; see the file COPYING. If not, write to the Free Software Foundation, 59 Temple Place - Suite 330, Boston, MA 02111-1307, USA. */ #if defined (__GNUG__) #pragma implementation #endif #ifdef HAVE_CONFIG_H #include #endif #include "mx-cs-m.h" #include "mx-m-cs.h" #include "gripes.h" #include "ov.h" #include "ov-complex.h" #include "ov-cx-mat.h" #include "ov-re-mat.h" #include "ov-typeinfo.h" #include "ops.h" #include "xdiv.h" #include "xpow.h" // complex scalar by matrix ops. DEFBINOP_OP (add, complex, matrix, +) DEFBINOP_OP (sub, complex, matrix, -) DEFBINOP_OP (mul, complex, matrix, *) DEFBINOP (div, complex, matrix) { BINOP_NONCONFORMANT ("operator /"); } DEFBINOP_FN (pow, complex, matrix, xpow) DEFBINOP (ldiv, complex, matrix) { CAST_BINOP_ARGS (const octave_complex&, const octave_matrix&); Complex d = v1.complex_value (); if (d == 0.0) gripe_divide_by_zero (); return octave_value (v2.matrix_value () / d); } DEFBINOP_FN (lt, complex, matrix, mx_el_lt) DEFBINOP_FN (le, complex, matrix, mx_el_le) DEFBINOP_FN (eq, complex, matrix, mx_el_eq) DEFBINOP_FN (ge, complex, matrix, mx_el_ge) DEFBINOP_FN (gt, complex, matrix, mx_el_gt) DEFBINOP_FN (ne, complex, matrix, mx_el_ne) DEFBINOP_OP (el_mul, complex, matrix, *) DEFBINOP_FN (el_div, complex, matrix, x_el_div) DEFBINOP_FN (el_pow, complex, matrix, elem_xpow) DEFBINOP (el_ldiv, complex, matrix) { CAST_BINOP_ARGS (const octave_complex&, const octave_matrix&); Complex d = v1.complex_value (); if (d == 0.0) gripe_divide_by_zero (); return octave_value (v2.matrix_value () / d); } DEFBINOP_FN (el_and, complex, matrix, mx_el_and) DEFBINOP_FN (el_or, complex, matrix, mx_el_or) DEFCONV (complex_matrix_conv, complex, complex_matrix) { CAST_CONV_ARG (const octave_complex&); return new octave_complex_matrix (v.complex_matrix_value ()); } void install_cs_m_ops (void) { INSTALL_BINOP (add, octave_complex, octave_matrix, add); INSTALL_BINOP (sub, octave_complex, octave_matrix, sub); INSTALL_BINOP (mul, octave_complex, octave_matrix, mul); INSTALL_BINOP (div, octave_complex, octave_matrix, div); INSTALL_BINOP (pow, octave_complex, octave_matrix, pow); INSTALL_BINOP (ldiv, octave_complex, octave_matrix, ldiv); INSTALL_BINOP (lt, octave_complex, octave_matrix, lt); INSTALL_BINOP (le, octave_complex, octave_matrix, le); INSTALL_BINOP (eq, octave_complex, octave_matrix, eq); INSTALL_BINOP (ge, octave_complex, octave_matrix, ge); INSTALL_BINOP (gt, octave_complex, octave_matrix, gt); INSTALL_BINOP (ne, octave_complex, octave_matrix, ne); INSTALL_BINOP (el_mul, octave_complex, octave_matrix, el_mul); INSTALL_BINOP (el_div, octave_complex, octave_matrix, el_div); INSTALL_BINOP (el_pow, octave_complex, octave_matrix, el_pow); INSTALL_BINOP (el_ldiv, octave_complex, octave_matrix, el_ldiv); INSTALL_BINOP (el_and, octave_complex, octave_matrix, el_and); INSTALL_BINOP (el_or, octave_complex, octave_matrix, el_or); INSTALL_ASSIGNCONV (octave_complex, octave_matrix, octave_complex_matrix); INSTALL_WIDENOP (octave_complex, octave_complex_matrix, complex_matrix_conv); } /* ;;; Local Variables: *** ;;; mode: C++ *** ;;; End: *** */